Small Mersenne Prime Factors (page 5370/5850)

Small Mersenne Prime Factors
Prime numbers of the form M_p= 2^p − 1 are called Mersenne primes. For M_p to be prime, p must also be prime.
Any factor q of a Mersenne number 2^p − 1 must be of the form 2kp + 1, where integer k ≥ 0. Furthermore, q must be 1 or 7 mod 8.

Exponent	Prime Factor	Dig.	Year
49150190123	98300380247	11	~2015
49157102639	98314205279	11	~2015
49157748851	98315497703	11	~2015
49160695163	98321390327	11	~2015
49160988421	786575814737	12	~2017
49161888977	393295111817	12	~2016
49163521777	294981130663	12	~2016
49166325443	98332650887	11	~2015
49168548677	393348389417	12	~2016
49169528693	295017172159	12	~2016
49171607123	98343214247	11	~2015
49172122799	98344245599	11	~2015
49175583323	98351166647	11	~2015
49177767493	786844279889	12	~2017
49179002233	786864035729	12	~2017
49180884661	295085307967	12	~2016
49185018359	98370036719	11	~2015
49185297643	491852976431	12	~2016
49185435503	98370871007	11	~2015
49185956213	688603386983	12	~2017
49187504137	295125024823	12	~2016
49189597007	393516776057	12	~2016
49193858951	98387717903	11	~2015
49193986607	885491758927	12	~2017
49194273721	295165642327	12	~2016

Exponent	Prime Factor	Dig.	Year
49194392857	3414...642759	14	2024
49196297303	98392594607	11	~2015
49199793911	98399587823	11	~2015
49200743279	98401486559	11	~2015
49205176001	295231056007	12	~2016
49205587393	295233524359	12	~2016
49207353263	98414706527	11	~2015
49207540783	787320652529	12	~2017
49213431383	98426862767	11	~2015
49215622243	492156222431	12	~2016
49217048779	492170487791	12	~2016
49217362679	98434725359	11	~2015
49218189479	98436378959	11	~2015
49219141619	1535...185129	14	2023
49221033473	295326200839	12	~2016
49222344491	98444688983	11	~2015
49222809683	98445619367	11	~2015
49225034399	98450068799	11	~2015
49227503797	295365022783	12	~2016
49228307603	98456615207	11	~2015
49229283611	98458567223	11	~2015
49229724119	98459448239	11	~2015
49234083071	98468166143	11	~2015
49234304243	98468608487	11	~2015
49235907131	98471814263	11	~2015

Exponent	Prime Factor	Dig.	Year
49236831131	98473662263	11	~2015
49237401431	98474802863	11	~2015
49238369357	295430216143	12	~2016
49238662751	98477325503	11	~2015
49240973443	492409734431	12	~2016
49248297251	98496594503	11	~2015
49249087319	98498174639	11	~2015
49250956589	394007652713	12	~2016
49253886119	98507772239	11	~2015
49261380941	295568285647	12	~2016
49261822619	98523645239	11	~2015
49263924407	394111395257	12	~2016
49266575651	98533151303	11	~2015
49267871699	98535743399	11	~2015
49269959723	98539919447	11	~2015
49274325673	295645954039	12	~2016
49276503851	98553007703	11	~2015
49277087407	788433398513	12	~2017
49278106151	98556212303	11	~2015
49279248779	98558497559	11	~2015
49279408697	394235269577	12	~2016
49280065931	98560131863	11	~2015
49280418101	295682508607	12	~2016
49281475751	98562951503	11	~2015
49282246031	98564492063	11	~2015

Exponent	Prime Factor	Dig.	Year
49283879423	98567758847	11	~2015
49288666331	98577332663	11	~2015
49288680971	98577361943	11	~2015
49291746011	98583492023	11	~2015
49291834043	98583668087	11	~2015
49296357751	492963577511	12	~2016
49297626083	98595252167	11	~2015
49297832123	98595664247	11	~2015
49299593177	295797559063	12	~2016
49302654899	98605309799	11	~2015
49305135563	98610271127	11	~2015
49307079737	690299116319	12	~2017
49308080039	98616160079	11	~2015
49310150171	98620300343	11	~2015
49311644183	98623288367	11	~2015
49312657679	98625315359	11	~2015
49314318899	98628637799	11	~2015
49314652319	98629304639	11	~2015
49317677939	98635355879	11	~2015
49318453139	98636906279	11	~2015
49319318119	493193181191	12	~2016
49319342783	98638685567	11	~2015
49320655583	5146...353023	15	2023
49326929303	98653858607	11	~2015
49327883233	295967299399	12	~2016

5.546.121 digits

26-05-03